Boundary maps and reducibility for cocycles into the isometries of CAT(0)-spaces

Abstract

Let be a discrete countable group acting isometrically on a measurable field X of CAT(0)-spaces of finite telescopic dimension over some ergodic standard Borel probability -space (,μ). If X does not admit any invariant Euclidean subfield, we prove that the measurable field X extended to a -boundary admits an invariant section. In the case of constant fields this shows the existence of Furstenberg maps for measurable cocycles, extending results by Bader, Duchesne and L\'ecureux. When <PU(n,1) is a torsion-free lattice and the CAT(0)-space is X(p,∞), we show that a maximal cocycle σ: × → PU(p,∞) with a suitable boundary map is finitely reducible. As a consequence, we prove an infinite dimensional rigidity phenomenon for maximal cocycles in PU(1,∞).